Abstract
The advection-diffusion equation with time dependent velocity and anisotropic time dependent diffusion tensor is examined in regard to its non-classical transport features and to the use of a non-orthogonal coordinate system. Although this equation appears in diverse physical problems, particularly in particle transport in stochastic velocity fields and in underground porous media, a detailed analysis of its solutions is lacking. In order to study the effects of the time-dependent coefficients and the anisotropic diffusion on transport, we solve analytically the equation for an initial Dirac delta pulse. We discuss the solutions to three cases: one based on power-law correlation functions where the pulse diffuses faster than the classical rate t, a second case specifically designed to display slower rate of diffusion than the classical one, and a third case to describe hydrodynamic dispersion in porous media.
Original language | English |
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Pages (from-to) | 40-48 |
Number of pages | 9 |
Journal | Revista Mexicana de Fisica |
Volume | 63 |
Issue number | 1 |
State | Published - 2017 |
Funding
This work has been partially supported by Conacyt-Sener-Hidrocarburos Fund through the project No. 143935. DdCN acknowledges support from the U.S. Department of Energy at Oak Ridge National Laboratory, managed by UT-Battalle, LLC, for the U.S. Department of Energy under contract DEAC05-00OR22725.
Funders | Funder number |
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Conacyt-Sener-Hidrocarburos Fund | 143935 |
UT-Battalle | DEAC05-00OR22725 |
U.S. Department of Energy | |
Oak Ridge National Laboratory |
Keywords
- Anisotropic media
- Time-dependent diffusion
- Tracer and pollutant transport